Sup, iam Shirley Barrett, I hope today is better than yesterday.
Whoa, talk about a head-scratcher! Turning 83 repeating fractions into decimals can be a real doozy. But don’t worry, I’m here to help you out. Let’s break it down and make it easy - no need to pull your hair out over this one! First off, let’s get the basics down: a repeating fraction is any fraction that has an infinite number of digits after the decimal point. So if you’re trying to turn 83 repeating fractions into decimals, you’ll need to figure out how many digits are in the fraction and then divide them by 10 until there are no more digits left. Sounds complicated? Don’t sweat it - I’m here to walk you through it step-by-step!
How Do You Turn 0.83 Repeating Into A Fraction? [Solved]
Well, that’s a mouthful! Basically, it’s saying 3.3 - 8.3 = -5.0. In other words, subtract 8.3 from 3.3 and you get a negative five!
Identify the repeating decimal: Determine which digits in the decimal are repeating.
Convert to a fraction: Express the repeating decimal as a fraction with a denominator of 10, 100, 1000, etc., depending on how many digits are repeating.
Simplify the fraction: Reduce the fraction to its simplest form by dividing both numerator and denominator by their greatest common factor (GCF).
Multiply by 83: Multiply both numerator and denominator of the simplified fraction by 83 to get your final answer.
Turning 83 is a piece of cake - it’s just a fraction of the way to 100! It’s not like you’re starting from scratch, so don’t sweat it. Plus, you’ve got plenty of time to get there. Hey, no rush!
